Noam Zeilberger dmonoid (Rev #2, changes)

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Idea

A dmonoid is a “directed” monoid.

A (left) dmonoid is a preorder $(X,\le)$ equipped with:

a binary operation $\cdot$ (called multiplication) which is monotonic in both arguments:
(1) $\array{ \arrayopts{\rowlines{solid}} a_1 \le a_2 \quad b_1 \le b_2 \\ a_1\cdot b_1 \le a_2\cdot b_2 }$

and which satisfies the semi-associative law:

(2) $(a \cdot b)\cdot c \le a \cdot (b\cdot c)$

for all $a,b,c \in X$ ; and
an element $I \in X$ (called unit) satisfying left and right unit laws:
(3) $I \cdot a \le a$
(4) $a \le a \cdot I$

for all $a \in X$ .

Ross Street. Skew-closed categories. Journal of Pure and Applied Algebra 217(6) (June 2013), arXiv:1205.6522
Kornel Szlachanyi. Skew-monoidal categories and bialgebroids. arXiv:1201.4981
Dov Tamari. Monoïdes préordonnés et chaînes de Malcev. Thèse, Université de Paris, 1951.
Dov Tamari. Sur quelques problèmes d’associativité. Ann. sci. de Univ. de Clermont-Ferrand 2, Sér. Math., vol. 24, pp. 91-107, 1964. url

Revision on May 1, 2017 at 19:03:49 by Noam Zeilberger?. See the history of this page for a list of all contributions to it.